bio | website | sites.google.com/site/… |
---|---|---|
location | University of Copenhagen | |
age | 29 | |
visits | member for | 5 years, 5 months |
seen | 32 mins ago | |
stats | profile views | 8,904 |
Apr 20 |
reviewed | Leave Open 'Stalk' of vanishing cycles at $k$-point |
Apr 15 |
comment |
Identify ring of polynomials symmetric under forgetting variables
Should your equation say $p(x_1,\dots,x_{n-1},0)=p(x_1,\dots,x_{i-1},0,x_{i+1},\dots,x_{n})$? |
Apr 12 |
comment |
Models for the moduli space $\overline{M}_{1,n}$
If you send me an e-mail I can send you Belorousski's thesis as pdf. |
Apr 10 |
reviewed | Leave Open Relative line bundle along divisor $D$ |
Apr 1 |
comment |
Character table of $\mathrm{SL}_2(\mathbb{Z}/p^n\mathbb{Z})$
Also, if you send me an e-mail I can send you a copy of Kutzko's PhD thesis. |
Apr 1 |
comment |
Character table of $\mathrm{SL}_2(\mathbb{Z}/p^n\mathbb{Z})$
I asked a similar question at one point, perhaps the answers there can be useful to you: mathoverflow.net/questions/87254 |
Mar 27 |
comment |
What's the analogue of a Young symmetrizer in the Brauer algebra?
@GjergjiZaimi I just looked at this question again and realized I didn't thank you -- Nazarov's formulas are exactly what I was looking for. It's amazing that this wasn't known until so recently!! |
Mar 22 |
revised |
Are there any natural differential operators besides $d$?
deleted 1 character in body |
Mar 16 |
awarded | Nice Answer |
Mar 16 |
answered | Should the Grothendieck ring of varieties be K_0 of numerical motives? |
Mar 14 |
answered | Parodies of abstruse mathematical writing |
Mar 13 |
awarded | Popular Question |
Mar 12 |
comment |
What's the analogue of a Young symmetrizer in the Brauer algebra?
Dear Darij, dear Martin: thanks for the pointers! It'll take me a few days to say whether they answer my question. |
Mar 12 |
asked | What's the analogue of a Young symmetrizer in the Brauer algebra? |
Mar 11 |
awarded | Popular Question |
Mar 11 |
answered | Definition of an E-infinity algebra |
Feb 26 |
comment |
Is there an analogue of the Tate (and Hodge) conjecture for varieties that are not proper smooth (i.e., the mixed case)?
I think this can be found in a book by Lewis, "A survey of the Hodge conjecture". I don't know how it relates to the formulation in terms of motivic cohomology. |
Feb 26 |
answered | Is there an analogue of the Tate (and Hodge) conjecture for varieties that are not proper smooth (i.e., the mixed case)? |
Feb 22 |
reviewed | Leave Open Property theories |
Feb 16 |
reviewed | Leave Open A specific Model of ZFC |